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ln(3x+5y^2)=z la ecuación

El profesor se sorprenderá mucho al ver tu solución correcta😉

Ha introducido [src]

   /         2\    
log\3*x + 5*y / = z

\log{\left(3 x + 5 y^{2} \right)} = z

Simplificar

Gráfica

Suma y producto de raíces [src]

suma

     /         2\      /|         2|\
I*arg\3*x + 5*y / + log\|3*x + 5*y |/

\log{\left(\left|{3 x + 5 y^{2}}\right| \right)} + i \arg{\left(3 x + 5 y^{2} \right)}

     /         2\      /|         2|\
I*arg\3*x + 5*y / + log\|3*x + 5*y |/

\log{\left(\left|{3 x + 5 y^{2}}\right| \right)} + i \arg{\left(3 x + 5 y^{2} \right)}

producto

     /         2\      /|         2|\
I*arg\3*x + 5*y / + log\|3*x + 5*y |/

\log{\left(\left|{3 x + 5 y^{2}}\right| \right)} + i \arg{\left(3 x + 5 y^{2} \right)}

     /         2\      /|         2|\
I*arg\3*x + 5*y / + log\|3*x + 5*y |/

\log{\left(\left|{3 x + 5 y^{2}}\right| \right)} + i \arg{\left(3 x + 5 y^{2} \right)}

i*arg(3*x + 5*y^2) + log(|3*x + 5*y^2|)

Respuesta rápida [src]

          /         2\      /|         2|\
z1 = I*arg\3*x + 5*y / + log\|3*x + 5*y |/

z_{1} = \log{\left(\left|{3 x + 5 y^{2}}\right| \right)} + i \arg{\left(3 x + 5 y^{2} \right)}

z1 = log(|3*x + 5*y^2|) + i*arg(3*x + 5*y^2)